1. Holomorphic rank-2 vector bundles on non-Kähler elliptic surfaces
- Author
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Ruxandra Moraru and Vasile Brinzanescu
- Subjects
Surface (mathematics) ,14J60 ,Pure mathematics ,Algebra and Number Theory ,Chern class ,Mathematics - Complex Variables ,Group (mathematics) ,Mathematical analysis ,Holomorphic function ,Vector bundle ,Rank (differential topology) ,Mathematics - Algebraic Geometry ,14D22, 14F05, 14J27, 32J15 ,Mathematics::Algebraic Geometry ,Complex vector bundle ,FOS: Mathematics ,Geometry and Topology ,Complex Variables (math.CV) ,Algebraic Geometry (math.AG) ,Mathematics::Symplectic Geometry ,Mathematics ,Splitting principle - Abstract
The existence problem for vector bundles on a smooth compact complex surface consists in determining which topological complex vector bundles admit holomorphic structures. For projective surfaces, Schwarzenberger proved that a topological complex vector bundle admits a holomorphic (algebraic) structure if and only if its first Chern class belongs to the Neron-Severi group of the surface. In contrast, for non-projective surfaces there is only a necessary condition for the existence problem (the discriminant of the vector bundles must be positive) and the difficulty of the problem resides in the lack of a general method for constructing non-filtrable vector bundles. In this paper, we close the existence problem in the rank-2 case, by giving necessary and sufficient conditions for the existence of holomorphic rank-2 vector bundles on non-K\" ahler elliptic surfaces., Comment: 15 pages, shortened version, corrections were made
- Published
- 2005
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